A group of isometries with non-closed orbits

Abels H, Manoussos A (2009) .

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Abstract
In this note we give an example of a one-dimensional manifold with twoconnected components and a complete metric whose group of isometries has anorbit which is not closed. This answers a question of S. Gao and A. S. Kechris.
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Abels H, Manoussos A. A group of isometries with non-closed orbits. 2009.
Abels, H., & Manoussos, A. (2009). A group of isometries with non-closed orbits.
Abels, H., and Manoussos, A. (2009). A group of isometries with non-closed orbits.
Abels, H., & Manoussos, A., 2009. A group of isometries with non-closed orbits.
H. Abels and A. Manoussos, “A group of isometries with non-closed orbits”, 2009.
Abels, H., Manoussos, A.: A group of isometries with non-closed orbits. (2009).
Abels, Herbert, and Manoussos, Antonios. “A group of isometries with non-closed orbits”. (2009).
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arXiv 0910.4717

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